Exotic 4-manifolds with signature zero
Abstract
We produce infinitely many distinct irreducible smooth 4-manifolds homeomorphic to #(2m+1)(CP2 # -CP2) and #(2n+1)(S2 x S2), respectively, for each m>3 and n>4. These provide the smallest exotic closed simply connected 4-manifolds with signature zero known to date, and in each one of these homeomorphism classes, we get minimal symplectic 4-manifolds. Our novel exotic 4-manifolds are derived from fairly special small Lefschetz fibrations we build via positive factorizations in the mapping class group, with spin and non-spin monodromies.
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